Largest known prime number: Difference between revisions
→Current record: 4 years 7 months to 4 years 8 months |
Numbermaniac (talk | contribs) →The twenty largest known prime numbers: References were the wrong way around - also, this is not a Generalized Fermat |
||
Line 458: | Line 458: | ||
|style="text-align:right;"| 6,317,602 |
|style="text-align:right;"| 6,317,602 |
||
|Generalized Fermat |
|Generalized Fermat |
||
| <ref>{{cite web|title=PrimeGrid's |
| <ref>{{cite web |title=PrimeGrid's Generalized Fermat Prime Search |url=https://www.primegrid.com/download/GFN-1059094_1048576.pdf |access-date=7 November 2018 |website=primegrid.com |publisher=[[PrimeGrid]]}}</ref> |
||
|- |
|- |
||
|style="text-align:right;"| 19 |
|style="text-align:right;"| 19 |
||
Line 464: | Line 464: | ||
| 2023-07-05 |
| 2023-07-05 |
||
|style="text-align:right;"| 6,300,184 |
|style="text-align:right;"| 6,300,184 |
||
| |
|||
|Generalized Fermat |
|||
| <ref>{{cite web|title=PrimeGrid's |
| <ref>{{cite web |title=PrimeGrid's 321 Prime Search |url=https://www.primegrid.com/download/321-20928756.pdf |access-date=17 July 2023 |website=primegrid.com |publisher=[[PrimeGrid]]}}</ref> |
||
|- |
|- |
||
|style="text-align:right;"| 20 |
|style="text-align:right;"| 20 |
Revision as of 16:16, 24 September 2023
The largest known prime number (as of September 2023[update]) is 282,589,933 − 1, a number which has 24,862,048 digits when written in base 10. It was found via a computer volunteered by Patrick Laroche of the Great Internet Mersenne Prime Search (GIMPS) in 2018.[1]
A prime number is a natural number greater than 1 with no divisors other than 1 and itself. According to Euclid's theorem there are infinitely many prime numbers, so there is no largest prime.
Many of the largest known primes are Mersenne primes, numbers that are one less than a power of two, because they can utilize a specialized primality test that is faster than the general one. As of June 2023[update], the six largest known primes are Mersenne primes.[2] The last seventeen record primes were Mersenne primes.[3][4] The binary representation of any Mersenne prime is composed of all ones, since the binary form of 2k − 1 is simply k ones.[5]
Current record
The record is currently held by 282,589,933 − 1 with 24,862,048 digits, found by GIMPS in December 2018.[1] The first and last 120 digits of its value are shown below:
148894445742041325547806458472397916603026273992795324185271289425213239361064475310309971132180337174752834401423587560 ...
(24,861,808 digits skipped)
... 062107557947958297531595208807192693676521782184472526640076912114355308311969487633766457823695074037951210325217902591[6]
This prime has been holding the record for 4 years and 8 months (as of September 2023), longer than any other record prime since M19937 (which held the record for 7 years, 1971–1978).
Prizes
There are several prizes offered by the Electronic Frontier Foundation (EFF) for record primes.[7] A prime with one million digits was found in 1999, earning the discoverer a US$50,000 prize.[8] In 2008, a ten-million digit prime won a US$100,000 prize and a Cooperative Computing Award from the EFF.[7] Time called this prime the 29th top invention of 2008.[9]
Both of these primes were discovered through the Great Internet Mersenne Prime Search (GIMPS), which coordinates long-range search efforts among tens of thousands of computers and thousands of volunteers. The $50,000 prize went to the discoverer and the $100,000 prize went to GIMPS. GIMPS will split the US$150,000 prize for the first prime of over 100 million digits with the winning participant. A further prize is offered for the first prime with at least one billion digits.[7]
GIMPS also offers a US$3,000 research discovery award for participants who discover a new Mersenne prime of less than 100 million digits.[10]
History of largest known prime numbers
The following table lists the progression of the largest known prime number in ascending order.[3] Here Mp = 2p − 1 is the Mersenne number with exponent p. The longest record-holder known was M19 = 524,287, which was the largest known prime for 144 years. No records are known prior to 1456.
Number | Decimal expansion (partial for numbers > M1000) |
Digits | Year found | Discoverer |
---|---|---|---|---|
M13 | 8,191 | 4 | 1456 | Anonymous |
M17 | 131,071 | 6 | 1588 | Pietro Cataldi |
M19 | 524,287 | 6 | 1588 | Pietro Cataldi |
6,700,417 | 7 | 1732 | Leonhard Euler? Euler did not explicitly publish the primality of 6,700,417, but the techniques he had used to factorise 232 + 1 meant that he had already done most of the work needed to prove this, and some experts believe he knew of it.[11] | |
M31 | 2,147,483,647 | 10 | 1772 | Leonhard Euler |
999,999,000,001 | 12 | 1851 | Included (but question-marked) in a list of primes by Looff. Given his uncertainty, some do not include this as a record. | |
67,280,421,310,721 | 14 | 1855 | Thomas Clausen (but no proof was provided). | |
M127 | 170,141,183,460,469, |
39 | 1876 | Édouard Lucas |
20,988,936,657,440, |
44 | 1951 | Aimé Ferrier with a mechanical calculator; the largest record not set by computer. | |
180×(M127)2+1 |
521064401567922879406069432539 |
79 | 1951 | J. C. P. Miller & D. J. Wheeler[12] Using Cambridge's EDSAC computer |
M521 |
686479766013060971498190079908 |
157 | 1952 | Raphael M. Robinson |
M607 |
531137992816767098689588206552 |
183 | 1952 | Raphael M. Robinson |
M1279 | 104079321946...703168729087 | 386 | 1952 | Raphael M. Robinson |
M2203 | 147597991521...686697771007 | 664 | 1952 | Raphael M. Robinson |
M2281 | 446087557183...418132836351 | 687 | 1952 | Raphael M. Robinson |
M3217 | 259117086013...362909315071 | 969 | 1957 | Hans Riesel |
M4423 | 285542542228...902608580607 | 1,332 | 1961 | Alexander Hurwitz |
M9689 | 478220278805...826225754111 | 2,917 | 1963 | Donald B. Gillies |
M9941 | 346088282490...883789463551 | 2,993 | 1963 | Donald B. Gillies |
M11213 | 281411201369...087696392191 | 3,376 | 1963 | Donald B. Gillies |
M19937 | 431542479738...030968041471 | 6,002 | 1971 | Bryant Tuckerman |
M21701 | 448679166119...353511882751 | 6,533 | 1978 | Laura A. Nickel and Landon Curt Noll[13] |
M23209 | 402874115778...523779264511 | 6,987 | 1979 | Landon Curt Noll[13] |
M44497 | 854509824303...961011228671 | 13,395 | 1979 | David Slowinski and Harry L. Nelson[13] |
M86243 | 536927995502...709433438207 | 25,962 | 1982 | David Slowinski[13] |
M132049 | 512740276269...455730061311 | 39,751 | 1983 | David Slowinski[13] |
M216091 | 746093103064...103815528447 | 65,050 | 1985 | David Slowinski[13] |
148140632376...836387377151 | 65,087 | 1989 | A group, "Amdahl Six": John Brown, Landon Curt Noll, B. K. Parady, Gene Ward Smith, Joel F. Smith, Sergio E. Zarantonello.[14][15] Largest non-Mersenne prime that was the largest known prime when it was discovered. | |
M756839 | 174135906820...328544677887 | 227,832 | 1992 | David Slowinski and Paul Gage[13] |
M859433 | 129498125604...243500142591 | 258,716 | 1994 | David Slowinski and Paul Gage[13] |
M1257787 | 412245773621...976089366527 | 378,632 | 1996 | David Slowinski and Paul Gage[13] |
M1398269 | 814717564412...868451315711 | 420,921 | 1996 | GIMPS, Joel Armengaud |
M2976221 | 623340076248...743729201151 | 895,932 | 1997 | GIMPS, Gordon Spence |
M3021377 | 127411683030...973024694271 | 909,526 | 1998 | GIMPS, Roland Clarkson |
M6972593 | 437075744127...142924193791 | 2,098,960 | 1999 | GIMPS, Nayan Hajratwala |
M13466917 | 924947738006...470256259071 | 4,053,946 | 2001 | GIMPS, Michael Cameron |
M20996011 | 125976895450...762855682047 | 6,320,430 | 2003 | GIMPS, Michael Shafer |
M24036583 | 299410429404...882733969407 | 7,235,733 | 2004 | GIMPS, Josh Findley |
M25964951 | 122164630061...280577077247 | 7,816,230 | 2005 | GIMPS, Martin Nowak |
M30402457 | 315416475618...411652943871 | 9,152,052 | 2005 | GIMPS, University of Central Missouri professors Curtis Cooper and Steven Boone |
M32582657 | 124575026015...154053967871 | 9,808,358 | 2006 | GIMPS, Curtis Cooper and Steven Boone |
M43112609 | 316470269330...166697152511 | 12,978,189 | 2008 | GIMPS, Edson Smith |
M57885161 | 581887266232...071724285951 | 17,425,170 | 2013 | GIMPS, Curtis Cooper |
M74207281 | 300376418084...391086436351 | 22,338,618 | 2016 | GIMPS, Curtis Cooper |
M77232917 | 467333183359...069762179071 | 23,249,425 | 2017 | GIMPS, Jonathan Pace |
M82589933 | 148894445742...325217902591 | 24,862,048 | 2018 | GIMPS, Patrick Laroche |
GIMPS found the fifteen latest records (all of them Mersenne primes) on ordinary computers operated by participants around the world.
The twenty largest known prime numbers
A list of the 5,000 largest known primes is maintained by the PrimePages,[16] of which the twenty largest are listed below.[17]
Rank | Number | Discovered | Digits | Form | Ref |
---|---|---|---|---|---|
1 | 282589933 − 1 | 2018-12-07 | 24,862,048 | Mersenne | [1] |
2 | 277232917 − 1 | 2017-12-26 | 23,249,425 | Mersenne | [18] |
3 | 274207281 − 1 | 2016-01-07 | 22,338,618 | Mersenne | [19] |
4 | 257885161 − 1 | 2013-01-25 | 17,425,170 | Mersenne | [20] |
5 | 243112609 − 1 | 2008-08-23 | 12,978,189 | Mersenne | [21] |
6 | 242643801 − 1 | 2009-06-04 | 12,837,064 | Mersenne | [22] |
7 | Φ3(−4658591048576) | 2023-05-31 | 11,887,192 | Cyclotomic polynomial | [23] |
8 | 237156667 − 1 | 2008-09-06 | 11,185,272 | Mersenne | [21] |
9 | 232582657 − 1 | 2006-09-04 | 9,808,358 | Mersenne | [24] |
10 | 10223 × 231172165 + 1 | 2016-10-31 | 9,383,761 | Proth | [25] |
11 | 230402457 − 1 | 2005-12-15 | 9,152,052 | Mersenne | [26] |
12 | 225964951 − 1 | 2005-02-18 | 7,816,230 | Mersenne | [27] |
13 | 224036583 − 1 | 2004-05-15 | 7,235,733 | Mersenne | [28] |
14 | 19637361048576 + 1 | 2022-09-24 | 6,598,776 | Generalized Fermat | [29] |
15 | 19517341048576 + 1 | 2022-08-09 | 6,595,985 | Generalized Fermat | [30] |
16 | 202705 × 221320516 + 1 | 2021-12-01 | 6,418,121 | Proth | [31] |
17 | 220996011 − 1 | 2003-11-17 | 6,320,430 | Mersenne | [32] |
18 | 10590941048576 + 1 | 2018-10-31 | 6,317,602 | Generalized Fermat | [33] |
19 | 3 × 220928756 − 1 | 2023-07-05 | 6,300,184 | [34] | |
20 | 9194441048576 + 1 | 2017-08-29 | 6,253,210 | Generalized Fermat | [35] |
See also
References
- ^ a b c "GIMPS Project Discovers Largest Known Prime Number: 282,589,933-1". Mersenne Research, Inc. 21 December 2018. Retrieved 21 December 2018.
- ^ "The largest known primes – Database Search Output". Prime Pages. Retrieved 19 March 2023.
- ^ a b Caldwell, Chris. "The Largest Known Prime by Year: A Brief History". Prime Pages. Retrieved 19 March 2023.
- ^ The last non-Mersenne to be the largest known prime, was 391,581 ⋅ 2216,193 − 1; see also The Largest Known Prime by year: A Brief History originally by Caldwell.
- ^ "Perfect Numbers". Penn State University. Retrieved 6 October 2019.
An interesting side note is about the binary representations of those numbers...
- ^ "51st Known Mersenne Prime Discovered".
- ^ a b c "Record 12-Million-Digit Prime Number Nets $100,000 Prize". Electronic Frontier Foundation. Electronic Frontier Foundation. October 14, 2009. Retrieved November 26, 2011.
- ^ Electronic Frontier Foundation, Big Prime Nets Big Prize.
- ^ "Best Inventions of 2008 - 29. The 46th Mersenne Prime". Time. Time Inc. October 29, 2008. Archived from the original on November 2, 2008. Retrieved January 17, 2012.
- ^ "GIMPS by Mersenne Research, Inc". mersenne.org. Retrieved 21 November 2022.
- ^ Edward Sandifer, C. (19 November 2014). How Euler Did Even More. ISBN 9780883855843.
- ^ J. Miller, Large Prime Numbers. Nature 168, 838 (1951).
- ^ a b c d e f g h i Landon Curt Noll, Large Prime Number Found by SGI/Cray Supercomputer.
- ^ Letters to the Editor. The American Mathematical Monthly 97, no. 3 (1990), p. 214. Accessed May 22, 2020.
- ^ Proof-code: Z, The Prime Pages.
- ^ "The Prime Database: The List of Largest Known Primes Home Page". t5k.org/primes. Retrieved 19 March 2023.
- ^ "The Top Twenty: Largest Known Primes". Retrieved 19 March 2023.
- ^ "GIMPS Project Discovers Largest Known Prime Number: 277,232,917-1". mersenne.org. Great Internet Mersenne Prime Search. Retrieved 3 January 2018.
- ^ "GIMPS Project Discovers Largest Known Prime Number: 274,207,281-1". mersenne.org. Great Internet Mersenne Prime Search. Retrieved 29 September 2017.
- ^ "GIMPS Discovers 48th Mersenne Prime, 257,885,161-1 is now the Largest Known Prime". mersenne.org. Great Internet Mersenne Prime Search. 5 February 2013. Retrieved 29 September 2017.
- ^ a b "GIMPS Discovers 45th and 46th Mersenne Primes, 243,112,609-1 is now the Largest Known Prime". mersenne.org. Great Internet Mersenne Prime Search. 15 September 2008. Retrieved 29 September 2017.
- ^ "GIMPS Discovers 47th Mersenne Prime, 242,643,801-1 is newest, but not the largest, known Mersenne Prime". mersenne.org. Great Internet Mersenne Prime Search. 12 April 2009. Retrieved 29 September 2017.
- ^ "PrimePage Primes: Phi(3, - 465859^1048576)". t5k.org.
- ^ "GIMPS Discovers 44th Mersenne Prime, 232,582,657-1 is now the Largest Known Prime". mersenne.org. Great Internet Mersenne Prime Search. 11 September 2006. Retrieved 29 September 2017.
- ^ "PrimeGrid's Seventeen or Bust Subproject" (PDF). primegrid.com. PrimeGrid. Retrieved 30 September 2017.
- ^ "GIMPS Discovers 43rd Mersenne Prime, 230,402,457-1 is now the Largest Known Prime". mersenne.org. Great Internet Mersenne Prime Search. 24 December 2005. Retrieved 29 September 2017.
- ^ "GIMPS Discovers 42nd Mersenne Prime, 225,964,951-1 is now the Largest Known Prime". mersenne.org. Great Internet Mersenne Prime Search. 27 February 2005. Retrieved 29 September 2017.
- ^ "GIMPS Discovers 41st Mersenne Prime, 224,036,583-1 is now the Largest Known Prime". mersenne.org. Great Internet Mersenne Prime Search. 28 May 2004. Retrieved 29 September 2017.
- ^ "PrimeGrid's Generalized Fermat Prime Search" (PDF). primegrid.com. PrimeGrid. Retrieved 7 October 2022.
- ^ "PrimeGrid's Generalized Fermat Prime Search" (PDF). primegrid.com. PrimeGrid. Retrieved 17 September 2022.
- ^ "PrimeGrid's Extended Sierpinski Problem Prime Search" (PDF). primegrid.com. PrimeGrid. Retrieved 28 December 2021.
- ^ "GIMPS Discovers 40th Mersenne Prime, 220,996,011-1 is now the Largest Known Prime". mersenne.org. Great Internet Mersenne Prime Search. 2 December 2003. Retrieved 29 September 2017.
- ^ "PrimeGrid's Generalized Fermat Prime Search" (PDF). primegrid.com. PrimeGrid. Retrieved 7 November 2018.
- ^ "PrimeGrid's 321 Prime Search" (PDF). primegrid.com. PrimeGrid. Retrieved 17 July 2023.
- ^ "PrimeGrid's Generalized Fermat Prime Search" (PDF). primegrid.com. PrimeGrid. Retrieved 30 September 2017.